On the Structure of the Commuting Graph of Brandt Semigroups

Collapsed adjacency diagrams and matrices of commuting graph, 𝒞 (G, X ) for some symmetric groups, Sym(n)

10.1063/5.0053458 ◽

2021 ◽

Author(s):

Athirah Nawawi ◽

Peter J. Rowley

Keyword(s):

Symmetric Groups ◽

Commuting Graph

Download Full-text

Isomorphism conditions for Cayley digraphs of Brandt semigroups

Journal of Information and Optimization Sciences ◽

10.1080/02522667.2017.1392088 ◽

2018 ◽

Vol 39 (2) ◽

pp. 481-493

Author(s):

John Meksawang ◽

Weerapong Wongpinit

Keyword(s):

Brandt Semigroups

Download Full-text

EXTENDING RESULTS OF MORGAN AND PARKER ABOUT COMMUTING GRAPHS

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972721000332 ◽

2021 ◽

pp. 1-9

Author(s):

NICOLAS F. BEIKE ◽

RACHEL CARLETON ◽

DAVID G. COSTANZO ◽

COLIN HEATH ◽

MARK L. LEWIS ◽

...

Keyword(s):

Frobenius Group ◽

Connected Components ◽

Commuting Graph

Abstract Morgan and Parker proved that if G is a group with ${\textbf{Z}(G)} = 1$ , then the connected components of the commuting graph of G have diameter at most $10$ . Parker proved that if, in addition, G is solvable, then the commuting graph of G is disconnected if and only if G is a Frobenius group or a $2$ -Frobenius group, and if the commuting graph of G is connected, then its diameter is at most $8$ . We prove that the hypothesis $Z (G) = 1$ in these results can be replaced with $G' \cap {\textbf{Z}(G)} = 1$ . We also prove that if G is solvable and $G/{\textbf{Z}(G)}$ is either a Frobenius group or a $2$ -Frobenius group, then the commuting graph of G is disconnected.

Download Full-text

Non-commuting graphs of certain almost simple groups

Asian-European Journal of Mathematics ◽

10.1142/s1793557119500815 ◽

2019 ◽

Vol 12 (05) ◽

pp. 1950081

Author(s):

M. Jahandideh ◽

R. Modabernia ◽

S. Shokrolahi

Keyword(s):

Finite Group ◽

Abelian Group ◽

Simple Group ◽

Simple Groups ◽

Almost Simple Group ◽

Almost Simple Groups ◽

Commuting Graph ◽

Vertex Set

Let [Formula: see text] be a non-abelian finite group and [Formula: see text] be the center of [Formula: see text]. The non-commuting graph, [Formula: see text], associated to [Formula: see text] is the graph whose vertex set is [Formula: see text] and two distinct vertices [Formula: see text] are adjacent if and only if [Formula: see text]. We conjecture that if [Formula: see text] is an almost simple group and [Formula: see text] is a non-abelian finite group such that [Formula: see text], then [Formula: see text]. Among other results, we prove that if [Formula: see text] is a certain almost simple group and [Formula: see text] is a non-abelian group with isomorphic non-commuting graphs, then [Formula: see text].

Download Full-text

Conditions on the Edges and Vertices of Non-commuting Graph

Jurnal Teknologi ◽

10.11113/jt.v74.1964 ◽

2015 ◽

Vol 74 (1) ◽

Author(s):

M. Jahandideh ◽

M. R. Darafsheh ◽

N. H. Sarmin ◽

S. M. S. Omer

Keyword(s):

Finite Group ◽

Conjugacy Classes ◽

Commuting Graph ◽

Vertex Set ◽

A Finite Group

Abstract - Let G􀡳 be a non- abelian finite group. The non-commuting graph ,􀪡is defined as a graph with a vertex set􀡳 − G-Z(G)􀢆in which two vertices x􀢞 and y􀢟 are joined if and only if xy􀢞􀢟 ≠ yx􀢟􀢞. In this paper, we invest some results on the number of edges set , the degree of avertex of non-commuting graph and the number of conjugacy classes of a finite group. In order that if 􀪡􀡳non-commuting graph of H ≅ non - commuting graph of G􀪡􀡴,H 􀡴 is afinite group, then |G􀡳| = |H􀡴| .

Download Full-text

The Non-Commuting, Non-Generating Graph of a Nilpotent Group

The Electronic Journal of Combinatorics ◽

10.37236/9802 ◽

2021 ◽

Vol 28 (1) ◽

Author(s):

Peter Cameron ◽

Saul Freedman ◽

Colva Roney-Dougal

Keyword(s):

Maximal Subgroup ◽

Nilpotent Group ◽

Commuting Graph ◽

Generating Graph ◽

Central Elements ◽

Vertex Set ◽

Infinite Case ◽

The Difference ◽

The Relationship

For a nilpotent group $G$, let $\Xi(G)$ be the difference between the complement of the generating graph of $G$ and the commuting graph of $G$, with vertices corresponding to central elements of $G$ removed. That is, $\Xi(G)$ has vertex set $G \setminus Z(G)$, with two vertices adjacent if and only if they do not commute and do not generate $G$. Additionally, let $\Xi^+(G)$ be the subgraph of $\Xi(G)$ induced by its non-isolated vertices. We show that if $\Xi(G)$ has an edge, then $\Xi^+(G)$ is connected with diameter $2$ or $3$, with $\Xi(G) = \Xi^+(G)$ in the diameter $3$ case. In the infinite case, our results apply more generally, to any group with every maximal subgroup normal. When $G$ is finite, we explore the relationship between the structures of $G$ and $\Xi(G)$ in more detail.

Download Full-text

On diameters estimations of the commuting graphs of Sylow $p$-subgroups of the symmetric groups

Carpathian Mathematical Publications ◽

10.15330/cmp.5.1.70-78 ◽

2013 ◽

Vol 5 (1) ◽

pp. 70-78 ◽

Cited By ~ 2

Author(s):

Yu.Yu. Leshchenko ◽

L.V. Zoria

Keyword(s):

Undirected Graph ◽

Symmetric Groups ◽

Commuting Graph ◽

Central Elements

The commuting graph of a group $G$ is an undirected graph whose vertices are non-central elements of $G$ and two distinct vertices $x,y$ are adjacent if and only if $xy=yx$. This article deals with the properties of the commuting graphs of Sylow $p$-subgroups of the symmetric groups. We define conditions of connectedness of respective graphs and give estimations of the diameters if graph is connected.

Download Full-text

A SURVEY ON THE AUTOMORPHISM GROUPS OF THE COMMUTING GRAPHS AND POWER GRAPHS

Facta Universitatis Series Mathematics and Informatics ◽

10.22190/fumi1904729m ◽

2019 ◽

pp. 729

Author(s):

Mahsa Mirzargar

Keyword(s):

Automorphism Group ◽

Automorphism Groups ◽

The Other ◽

Power Graph ◽

Commuting Graph ◽

Vertex Set ◽

Delta G ◽

Nite Group

Let G be a nite group. The power graph P(G) of a group G is the graphwhose vertex set is the group elements and two elements are adjacent if one is a power of the other. The commuting graph \Delta(G) of a group G, is the graph whose vertices are the group elements, two of them joined if they commute. When the vertex set is G-Z(G), this graph is denoted by \Gamma(G). Since the results based on the automorphism group of these kinds of graphs are so sporadic, in this paper, we give a survey of all results on the automorphism group of power graphs and commuting graphs obtained in the literature.

Download Full-text

A generalization of commuting graphs

Discrete Mathematics Algorithms and Applications ◽

10.1142/s1793830914500682 ◽

2015 ◽

Vol 07 (01) ◽

pp. 1450068 ◽

Cited By ~ 2

Author(s):

M. Afkhami ◽

Z. Barati ◽

N. Hoseini ◽

K. Khashyarmanesh

Keyword(s):

Directed Graph ◽

Identity Element ◽

Basic Properties ◽

Commuting Graph ◽

Vertex Set

Let R be a ring with the identity element 1, α be an endomorphism of R and δ be a left α-derivation. In this paper, we introduce a generalization of a commuting graph, which is denoted by ΓR(α, δ), as a directed graph with vertex set R and, for two distinct vertices x and y, there is an arc from x to y if and only if xy = α(y)x + δ(y). We study some basic properties of ΓR(α, δ). Also, we investigate the planarity and genus of the graph ΓR(α, 0).

Download Full-text

Endomorphism Seminear-Rings of Brandt Semigroups

Communications in Algebra ◽

10.1080/00927870903286892 ◽

2010 ◽

Vol 38 (11) ◽

pp. 4028-4041 ◽

Cited By ~ 2

Author(s):

N. D. Gilbert ◽

Mohammad Samman

Keyword(s):

Brandt Semigroups

Download Full-text